menu
bartleby
search
close search
Hit Return to see all results

Basic Technical Mathematics plus MyLab Math with Pearson eText -- Title-Specific Access Card Package (11th Edition) 11th Edition

Basic Technical Mathematics plus MyLab Math with Pearson eText -- Title-Specific Access Card Package (11th Edition) - 11th Edition - by Allyn J. Washington, Richard Evans - ISBN 9780134769547
Buy this textbookBuyarrow_forward

Basic Technical Mathematics plus MyLab ...
11th Edition
Allyn J. Washington, Richard Evans
Publisher: PEARSON
ISBN: 9780134769547

Solutions for Basic Technical Mathematics plus MyLab Math with Pearson eText -- Title-Specific Access Card Package (11th Edition)

View Samples
Chapter
Section

Book Details

The best-seller in technical mathematics gets an "Oh, wow!" update

Basic Technical Mathematics is a bold revision of this classic best-seller. The text now sports an engaging full-color design, and new co-author Rich Evans has introduced a wealth of relevant applications and improvements, many based on user feedback. The text is supported by an all-new online graphing calculator manual, accessible at point-of-use via short URLs. The MyLab Math course features hundreds of new algorithmic exercises, tutorial videos, and PowerPoint slides.  The text continues to feature a vast number of applications from technical and pre-engineering fields-including computer design, electronics, solar energy, lasers fiber optics, and the environment-and aims to develop students’ understanding of mathematical methods without simply providing a collection of formulas. The authors start the text by establishing a solid background in algebra and trigonometry, recognizing the importance of these topics for success in solving applied problems.

Sample Solutions for this Textbook

We offer sample solutions for Basic Technical Mathematics plus MyLab Math with Pearson eText -- Title-Specific Access Card Package (11th Edition) homework problems. See examples below:
Show more sample solutions
add
Rule used: The exponent rule: a0=1 where a≠0. Calculation: Given that, the equation is 2x0=1....Result used: The imaginary unit −1 is denoted by the symbol j. In other words, j=−1 and j2=−1....Definition used: The exponential function is defined as y=bx, where b>0,b≠1 and x is any real...The given statement is, “To get the calculator display of the equation 2x2+y2=4, let y1=4−2x2.” Note...Procedure used: Procedure for Synthetic Division: “1. Write the coefficients of f(x). Be certain...Check the matrix operation as follows: 2[3−102]=[6−202][6−204]≠[6−202]LHS≠RHS Hence,...Consider the inequality 1<x<−3. The given inequality 1<x<−3 can be written as 1<x and...The ratio of 25 cm to 50 mm is computed as, 25 cm50 mm=250 mm50 mm=5 That is, the ratio of 25 cm to...Definition used: n terms: The nth term of the arithmetic sequence is given by an=a1+(n−1)d, where an...Formula used: The Basic Trigonometric Identity: tanθ=sinθcosθ. Calculation: The given identity is...Formula used: The formula for distance between any two points d=(x2−x1)2−(y2−y1)2. Calculation: Find...Formula used: The limit of a function f(x) is that value of the limit of the function approaches as...Differentiate y with respect to the x. y=ddx(3x2−5)dydx=3(2x)−5=6x−5 Slope of tangent of the curve...Consider the give statement. Let the initial velocity of an object be v0. Since the horizontal...Formula used: The derivative of sinu is d(sinu)dx=cosududx. Calculation: Evaluate the derivative of...Formula used: Log rule for integration: ∫duu=ln|u|+C Calculation: The given integral is ∫dx1+2x....It is given that if the function is f(x,y)=2x2y−y22xy, then f(y2,x)=2xy4−x22x2y . Replace x=y2 and...Result used: Let ∑n=0∞a1rn be a geometric series of terms, the partial sums Sn represents the sum...Definition used: “A solution of a differential equation is a relation between the variables that...